15,572 reputation
23993
bio website sites.google.com/site/…
location University of Copenhagen
age 29
visits member for 5 years, 5 months
seen 32 mins ago

Apr
20
reviewed Leave Open 'Stalk' of vanishing cycles at $k$-point
Apr
15
comment Identify ring of polynomials symmetric under forgetting variables
Should your equation say $p(x_1,\dots,x_{n-1},0)=p(x_1,\dots,x_{i-1},0,x_{i+1},\dots,x_{n})$?
Apr
12
comment Models for the moduli space $\overline{M}_{1,n}$
If you send me an e-mail I can send you Belorousski's thesis as pdf.
Apr
10
reviewed Leave Open Relative line bundle along divisor $D$
Apr
1
comment Character table of $\mathrm{SL}_2(\mathbb{Z}/p^n\mathbb{Z})$
Also, if you send me an e-mail I can send you a copy of Kutzko's PhD thesis.
Apr
1
comment Character table of $\mathrm{SL}_2(\mathbb{Z}/p^n\mathbb{Z})$
I asked a similar question at one point, perhaps the answers there can be useful to you: mathoverflow.net/questions/87254
Mar
27
comment What's the analogue of a Young symmetrizer in the Brauer algebra?
@GjergjiZaimi I just looked at this question again and realized I didn't thank you -- Nazarov's formulas are exactly what I was looking for. It's amazing that this wasn't known until so recently!!
Mar
22
revised Are there any natural differential operators besides $d$?
deleted 1 character in body
Mar
16
awarded  Nice Answer
Mar
16
answered Should the Grothendieck ring of varieties be K_0 of numerical motives?
Mar
14
answered Parodies of abstruse mathematical writing
Mar
13
awarded  Popular Question
Mar
12
comment What's the analogue of a Young symmetrizer in the Brauer algebra?
Dear Darij, dear Martin: thanks for the pointers! It'll take me a few days to say whether they answer my question.
Mar
12
asked What's the analogue of a Young symmetrizer in the Brauer algebra?
Mar
11
awarded  Popular Question
Mar
11
answered Definition of an E-infinity algebra
Feb
26
comment Is there an analogue of the Tate (and Hodge) conjecture for varieties that are not proper smooth (i.e., the mixed case)?
I think this can be found in a book by Lewis, "A survey of the Hodge conjecture". I don't know how it relates to the formulation in terms of motivic cohomology.
Feb
26
answered Is there an analogue of the Tate (and Hodge) conjecture for varieties that are not proper smooth (i.e., the mixed case)?
Feb
22
reviewed Leave Open Property theories
Feb
16
reviewed Leave Open A specific Model of ZFC